Determine whether S is a basis for P3.S = (3- 4t2 + t, -3 + t2, 2t + t, 6t}O S is a basis of P3.O Sis not a basis of P3.

Given that S = {3-4t2+t3 , -3+t2 , 2t+t3 , 6t}

Answered: Determine whether S is a basis for Pa.…

Determine whether S is a basis for Pa. S = (3- 4t2 + t,-3 + t2, 2t + te, 6t) O S is a basis of P3. O S is not a basis of P3.

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter4: Vector Spaces

Section4.CR: Review Exercises

Problem 33CR: Determine whether S={1t,2t+3t2,t22t3,2+t3} is a basis for P3.

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Question

Determine whether S is a basis for P3.
S = (3- 4t2 + t, -3 + t2, 2t + t, 6t}
O S is a basis of P3.
O Sis not a basis of P3.

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